Open manifolds with non-homeomorphic positively curved souls
- González-Álvaro, David Université de Fribourg, Switzerland
- Zibrowius, Marcus Heinrich–Heine–Universität Düsseldorf, Germany
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11.07.2019
Published in:
- Mathematical Proceedings of the Cambridge Philosophical Society. - 2020, vol. 169, no. 2, p. 357–376
English
We extend two known existence results to simply connected manifolds with positive sectional curvature: we show that there exist pairs of simply connected positively- curved manifolds that are tangentially homotopy equivalent but not homeomorphic, and we deduce that an open manifold may admit a pair of non-homeomorphic simply connected and positively-curved souls. Examples of such pairs are given by explicit pairs of Eschenburg spaces. To deduce the second statement from the first, we extend our earlier work on the stable converse soul question and show that it has a positive answer for a class of spaces that includes all Eschenburg spaces.
- Faculty
- Faculté des sciences et de médecine
- Department
- Département de Mathématiques
- Language
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- English
- Classification
- Mathematics
- License
- License undefined
- Identifiers
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- RERO DOC 329427
- DOI 10.1017/S0305004119000227
- Persistent URL
- https://folia.unifr.ch/unifr/documents/309026
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